To simplify the expression (3g-4)-2(3g+4), start by distributing the -2 to the terms inside the parentheses:
3g - 4 - 2 * 3g - 2 * 4
Simplify the expression:
3g - 4 - 6g - 8
Combine like terms:
(3g - 6g) + (-4 - 8)
-3g - 12
The simplified expression is -3g - 12.
Subtract: (3g-4)-2(3g+4)
13 answers
Use the properties of operation to add
9(k+1/3)+10(1/2k-1)
9(k+1/3)+10(1/2k-1)
To add the expression 9(k+1/3)+10(1/2k-1), we can first simplify each term separately using the distributive property.
For the first term, distribute the 9 to both terms inside the parentheses:
9k + 9 * 1/3
9k + 3
For the second term, distribute the 10 to both terms inside the parentheses:
10 * 1/2k - 10 * 1
5k - 10
Now, we can add the two simplified terms:
(9k + 3) + (5k - 10)
Combining like terms:
9k + 5k + 3 - 10
14k - 7
So, the sum of the expression 9(k+1/3)+10(1/2k-1) is 14k - 7.
For the first term, distribute the 9 to both terms inside the parentheses:
9k + 9 * 1/3
9k + 3
For the second term, distribute the 10 to both terms inside the parentheses:
10 * 1/2k - 10 * 1
5k - 10
Now, we can add the two simplified terms:
(9k + 3) + (5k - 10)
Combining like terms:
9k + 5k + 3 - 10
14k - 7
So, the sum of the expression 9(k+1/3)+10(1/2k-1) is 14k - 7.
Use the properties of operations to add 4(g-2)+(g+2)
To add the expression 4(g-2)+(g+2), we can first distribute the 4 to the terms inside the first set of parentheses, and distribute the 1 to the terms inside the second set of parentheses:
4g - 4*2 + g + 2
Simplifying:
4g - 8 + g + 2
Combine like terms:
(4g + g) + (-8 + 2)
5g - 6
So, the sum of the expression 4(g-2)+(g+2) is 5g - 6.
4g - 4*2 + g + 2
Simplifying:
4g - 8 + g + 2
Combine like terms:
(4g + g) + (-8 + 2)
5g - 6
So, the sum of the expression 4(g-2)+(g+2) is 5g - 6.
Use the properties of operations to subtract (h+k)-(2k-h)
To subtract (h+k)-(2k-h), we need to distribute the negative sign to each term inside the parentheses:
(h+k) - 2k + h
Now, let's combine like terms:
h + h + k - 2k
Group the terms with h together and the terms with k together:
2h - k
So, the simplified expression is 2h - k.
(h+k) - 2k + h
Now, let's combine like terms:
h + h + k - 2k
Group the terms with h together and the terms with k together:
2h - k
So, the simplified expression is 2h - k.
Use the properties of operation to subtract
(p-3)-(2.4+2p)
(p-3)-(2.4+2p)
To simplify the expression (p-3)-(2.4+2p), we can first distribute the negative sign to both terms inside the second set of parentheses:
(p - 3) - 2.4 - 2p
Next, we can combine like terms:
p - 2p - 3 - 2.4
Simplify the coefficients:
-p - 2p = -3p
Simplify the constants:
-3 - 2.4 = -5.4
Combine the simplified terms:
-3p - 5.4
So, the simplified expression is -3p - 5.4.
(p - 3) - 2.4 - 2p
Next, we can combine like terms:
p - 2p - 3 - 2.4
Simplify the coefficients:
-p - 2p = -3p
Simplify the constants:
-3 - 2.4 = -5.4
Combine the simplified terms:
-3p - 5.4
So, the simplified expression is -3p - 5.4.
The answers are
1. 3p-5.4
2. p-5.4
3. -p-5.4
4. -p+5.4
1. 3p-5.4
2. p-5.4
3. -p-5.4
4. -p+5.4
Apologies for the confusion. Let's re-evaluate the simplification of (p-3)-(2.4+2p).
Starting with the expression: (p - 3) - 2.4 - 2p
Now, let's combine like terms:
p - 2p - 3 - 2.4
Combine the simplified terms:
-p - 5.4
So, the simplified expression is -p - 5.4. Therefore, the correct answer is option 3: -p - 5.4.
Starting with the expression: (p - 3) - 2.4 - 2p
Now, let's combine like terms:
p - 2p - 3 - 2.4
Combine the simplified terms:
-p - 5.4
So, the simplified expression is -p - 5.4. Therefore, the correct answer is option 3: -p - 5.4.
Subtract: 2(k-4)-3(2k-1)
To subtract 2(k-4)-3(2k-1), we can first distribute the 2 and the -3 to the terms inside the parentheses:
2k - 2*4 - 3*2k + 3*1
Simplify each term:
2k - 8 - 6k + 3
Combine like terms:
(2k - 6k) + (-8 + 3)
-4k - 5
So, the simplified expression is -4k - 5.
2k - 2*4 - 3*2k + 3*1
Simplify each term:
2k - 8 - 6k + 3
Combine like terms:
(2k - 6k) + (-8 + 3)
-4k - 5
So, the simplified expression is -4k - 5.